12 research outputs found
Conception et rĂ©alisation des capteurs hybrides photovoltaĂŻque-thermiques sous vide ou avec lame dâair confinĂ©e
Get PDFCette Ă©tude fait lâanalyse des performances thermiques et Ă©lectriques de deux types de capteurs solaires hybrides photovoltaĂŻque-thermiques Ă air intĂ©grables en toitures des bĂątiments. Pour ces capteurs hybrides, les cellules PV sont isolĂ©es soit avec une lame dâair confinĂ©e ou soit avec un gap vide. La modĂ©lisation des transferts de chaleur dans les systĂšmes est effectuĂ©e en 2D et en rĂ©gime transitoire, suivant lâapproche nodale. Le code numĂ©rique dĂ©veloppĂ© a Ă©tĂ© validĂ© et a permis dâanalyser les comportements thermiques ainsi que les efficacitĂ©s thermique et Ă©lectrique des capteurs. Lâoptimisation des paramĂštres fonctionnels est ensuite effectuĂ©e et prĂ©sentĂ©e.Mots-clĂ©s: Ă©nergie solaire, cellules photovoltaĂŻques, capteurs solaires hybrides (PV/T), transferts thermiques. Conception and realization of hybrid photovoltaic thermal collectors with empty gap or with enclosed air cavityThe present work reports thermal and electrical efficiencies for two solar hybrid photovoltaic-thermal air collectors integrated into the roof of the buildings. In these hybrid collectors, the PV cells are insulated with the enclosed air film or with the empty gap cavity. The unsteady and two-dimensional heat transfer equations are proposed and these equations are discretized using nodal method. The numerical model developed is validated. Then thermal and electrical efficiencies are analyzed for the collectors. The optimization of the characteristics parameters is studied in detail.Keywords: solar energy, photovoltaic cells, hybrid solar collector, heat transfer, nodal method
Formulation matricielle des equations du mouvement dâun solide rigide et identification de ses parametres inertiels
No full textPlusieurs formulations des Ă©quations du mouvement d'un rigide ont Ă©tĂ© dĂ©veloppĂ©es. Le bien connu d'entre elles est celle de Newton-Euler; elle est gĂ©nĂ©ralement appelĂ©e «équations d'Euler classiques". Cette formulation donne six Ă©quations scalaires pour un corps rigide. Dans cet article, nous avons dĂ©crit les Ă©quations du mouvement d'un solide rigide par une formulation matricielle. Les matrices figurant dans notre description de mouvement sont homogĂšnes Ă une unitĂ© identique. Les caractĂ©ristiques d'inertie sont rĂ©unies dans une matrice symĂ©trique 4x4 dĂ©finie positive appelĂ© "tenseur gĂ©nĂ©ralisĂ© de Poinsot". Cette matrice est composĂ© de matrice symĂ©trique 3x3 dĂ©finie positive appelĂ©e "tenseur d'inertie de Poinsot", les coordonnĂ©es du centre de masse multipliĂ© par la masse totale du corps et de la masse totale du corps rigide Les Ă©quations du mouvement sont formulĂ©es comme une Ă©galitĂ© entre les matrices antisymĂ©triques 4x4. Ils rĂ©sument le «principe de la dynamique fondamentaux" (Ă©galitĂ©Â entre les tenseurs dynamiques et les tenseurs des efforts extĂ©rieurs). Le tenseur gĂ©nĂ©ralisĂ© de Poinsot apparaĂźt linĂ©airement dans cette Ă©galitĂ© tel que requis par la dĂ©pendance linĂ©aire des Ă©quations de mouvement par rapport aux dix caractĂ©ristiques d'inertie du solide rigide. Nous avons Ă©tablie Ă la fin de ce papier la technique pour identifier les caractĂ©ristiques d'inertie du solide qui a Ă©tĂ© exĂ©cutĂ©e sur un cube.Mots clĂ©s : Mouvement dâun solide rigide, matrice dâinertie de Poinsot, identification.ABSTRACTSeveral formulations of the equations of motion of a rigid were developed. The wellknown of the Newton-Euler equations; it is generally called "classical Euler equations." This formulation gives six scalar equations for a rigid body. In this article, we described the equations of motion of a rigid solid by a matrix formulation. The matrices contained in our movement description are homogeneous to the same unit. Inertial characteristics are met in a 4x4 positive definite symmetric matrix called "tensor generalized Poinsot." This matrix consists of 3x3 positive definite symmetric matrix called "inertia tensor Poinsot", the coordinates of the center of mass multiplied by the total body mass and the total mass of the rigid body The equations of motion are formulated as a gender skew 4x4 matrices. They summarize the "principle of fundamental dynamics" (gender dynamics and tensor lestenseurs external forces). The Poinsot generalized tensor appears linearly in this equality as required by the linear dependence of the equations of motion with the ten characteristics inertia of the rigid solid. We established at the end of this paper a technique to identify the solid inertia characteristics which is performed on a cube.Keywords: A rigid solid movement, "inertia tensor Poinsot", identification
Numerical determination of the mean value of an elasticity tensor by integration over the rotation group with Haar measure
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Representing a non-associated constitutive law by a bipotential issued from a Fitzpatrick sequence
No full textRepresenting a non-associated constitutive law by a bipotential issued from a Fitzpatrick sequence
No full textPolymers thermophysics parameters estimation in one-dimensional case
No full textThis paper sets out an identification method for the thermal conductivity λ and the heat capacity per unit volume Ïc of a polymer material. The measurement of the temperature is registered with infrared camera. An inverse reading of the F.E.M. allows to perform this identification by solving a linear algebraic system coming from a least square method. The relative uncertainty obtained in experimental case are very good
Numerical simulations of turbulence-radiation interaction in a cylindrical incinerator of the smokes produced by household wastes
No full textInternational audienc
